已知:抛物线y^2=2px,(p>0)
y'=dy/dx=p/y,dx=(y/p)dy
根据弧长的微分公式:ds=[(1+y'^2)^(1/2)]dx.
对于曲线上的任一点M(x,y)来说,从顶点到M点的弧长为对ds进行积分,即从0积到y.
S=∫[(1+y'^2)^(1/2)]dx(从0积到y)
=∫{[1+(p/y)^2]^(1/2)}(y/p)dy (从0积到y)
=(1/p)∫[p^2+y^2]^(1/2)]dy (从0积到y)
由积分表可知:∫[p^2+y^2]^(1/2)]dy =(y/2)(p^2+y^2)^(1/2)+[(p^2)/2]ln[y+(p^2+y^2)^(1/2)]+C
得:S=(1/p){(y/2)(p^2+y^2)^(1/2)+[(p^2)/2]ln[y+(p^2+y^2)^(1/2)]-lnp}
=(y/2p)(p^2+y^2)^(1/2)+(p/2)ln[y+(p^2+y^2)^(1/2)]/p]
